= Repetition probabilities = Suppose we have a sequence of length 6 (k) taken from a possible 92 (K) stimuli and wish to consider the probability of a repetition of any single stimulus in a randomly drawn sequence then we consider two probabilities below concerning repetition of a single stimulus and an entire sequence of stimuli. The probability of any of the six of the 92 stimuli repeating in a randomly drawn sequence of length six = 1 – [(92 x 91 x 90 x89 x88) / 92^6] = 0.99 = 1 – (number of sequences of length six which have no repetition of any of the 92 stimuli e.g. ABCDEF) / (total number of possible sequences of length 6 chosen from 92 stimuli) so we are almost sure to get a single stimulus repeated in a randomly chosen sequence of length 6. Another repetition which we may be interested in is the probability of an entire sequence of length 6 taken from 92 stimuli repeating in n independent draws: This equals 1 – P(no repetition of any sequence in the n draws) = 1 – $$ Product(i=0, n-1) [92^6 ^ – i] / [92 ^6 ^] $$ since there are 92^6 possibly distinct sequences of 92 stimuli of length 6 and once we have used one we don’t want to use it again. which from this website = 1 - $$( [92^6 ^ !] / [(92^6 ^)^n ^ (92^6 ^ - n)!] )